5.7 Warm Up Warm Up Lesson Quiz Lesson Quiz Lesson Presentation Lesson Presentation Predict with Linear Models.

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5.7 Warm Up Warm Up Lesson Quiz Lesson Quiz Lesson Presentation Lesson Presentation Predict with Linear Models

5.7 Warm-Up 2. The table shows the profits of a company. Write an equation modeling the profit y as the function of the number of years x since ANSWER 15.5; 20.5 y = 2.8x Evaluate f(x) = 2.5x + 8 when x is 3 or 5.

5.7 Example 1 CD SINGLES The table shows the total number of CD single shipped (in millions) by manufacturers for several years during the period 1993–1997. Make a scatter plot of the data. b.b. Find an equation that models the number of CD singles shipped (in millions) as a function of the number of years since c.c. Approximate the number of CD singles shipped in a.a.

5.7 Example 1 SOLUTION a. Enter the data into lists on a graphing calculator. Make a scatter plot, letting the number of years since 1993 be the x -values (0, 2, 3, 4) and the number of CD singles shipped be the y- values. b. Perform linear regression using the paired data. The equation of the best-fitting line is approximately y = 14x

5.7 Example 1 c. Graph the best-fitting line. Use the trace feature and the arrow keys to find the value of the equation when x = 1. ANSWER About 16 million CD singles were shipped in 1994.

5.7 Example 2 CD SINGLES Look back at Example 1. a.a. Use the equation from Example 1 to approximate the number of CD singles shipped in 1998 and in b.b. In 1998 there were actually 56 million CD singles shipped. In 2000 there were actually 34 million CD singles shipped. Describe the accuracy of the extrapolations made in part (a).

5.7 Example 2 SOLUTION a.a. Evaluate the equation of the best-fitting line from Example 1 for x = 5 and x = 7. The model predicts about 72 million CD singles shipped in 1998 and about 100 million CD singles shipped in 2000.

5.7 Example 2 b.b. The differences between the predicted number of CD singles shipped and the actual number of CD singles shipped in 1998 and 2000 are 16 million CDs and 66 million CDs, respectively. The difference in the actual and predicted numbers increased from 1998 to So, the equation of the best - fitting line gives a less accurate prediction for the year that is farther from the given years.

5.7 Guided Practice 1. HOUSE SIZE The table shows the median floor area of new single-family houses in the United States during the period 1995–1999. a. Find an equation that models the floor area (in square feet) of a new single-family house as a function of the number of years since ANSWER y = 26.6x

5.7 Guided Practice c. Which of the predictions from part (b) would you expect to be more accurate? Explain your reasoning. b. Predict the median floor area of a new single- family house in 2000 and in ANSWERabout ft 2, about 2081 ft 2 ANSWER The prediction for 2000 because the farther removed an x -value is from the known x -values, the less confidence you can have in the accuracy of the predicted y -value.

5.7 Example 3 SOFTBALL The table shows the number of participants in U.S. youth softball during the period 1997–2001. Predict the year in which the number of youth softball participants reaches 1.2 million.

5.7 Example 3 SOLUTION Perform linear regression. Let x represent the number of years since 1997, and let y represent the number of youth softball participants (in millions). The equation for the best-fitting line is approximately y = –0.02x STEP 1

5.7 Example 3 STEP 2 Graph the equation of the best- fitting line. Trace the line until the cursor reaches y = 1.2. The corresponding x -value is shown at the bottom of the calculator screen. ANSWER There will be 1.2 million participants about 12 years after 1997, or in 2009.

5.7 Guided Practice 2. SOFTBALL In Example 3, in what year will there be 1.25 million youth softball participants in the U.S? ANSWER 2006

5.7 Example 4 SOLUTION SOFTBALL Look back at Example 3. Find the zero of the function. Explain what the zero means in this situation. Substitute 0 for y in the equation of the best-fitting line and solve for x. y = –0.02x Write the equation. 0 = –0.02x Substitute 0 for y. x 72 Solve for x.

5.7 Example 4 ANSWER The zero of the function is about 72. The function has a negative slope, which means that the number of youth softball participants is decreasing. According to the model, there will be no youth softball participants 72 years after 1997, or in 2069.

5.7 Guided Practice JET BOATS The number y (in thousands) of jet boats purchased in the U.S. can be modeled by the function y = –1.23x + 14 where x is the number of years since Find the zero of the function. Explain what the zero means in this situation. 3. ANSWER 11.4; the function has a negative slope, which means that the number of jet boats purchased in the U.S. is decreasing. According to the model, there will be no jet boats purchased 11.4 years after 1995, or in 2006.

5.7 Lesson Quiz 1. Find the zero of the function f(x) = 2.5x – 6. ANSWER 2.4 ANSWER y = –0.2x , where x is the number of years after The model predicts about 2150 video rentals in 1999 and 1350 video rentals in The table shows the number of video rentals at a store from 1998 to Find an equation that models the number of video rentals as a function of the number of years since Predict the number of rentals in 1999 and 2003.